Inverse of generalized Nevanlinna function that is holomorphic at infinity

Abstract

Let (H,(.,.)) be a Hilbert space and let L(H) be the linear space of bounded operators in H. In this paper, we deal with L(H)-valued function Q that belongs to the generalized Nevanlinna class N (H), where is a non-negative integer. It is the class of functions meromorphic on C R, such that Q(z)*=Q(z) and the kernel NQ( z,w ):=Q( z )-Q( w ) z-w has negative squares. A focus is on the functions Q ∈ N (H) which are holomorphic at ∞. A new operator representation of the inverse function Q( z ):=-Q( z )-1 is obtained under the condition that the derivative at infinity Q'( ∞):=z ∞zQ(z) is boundedly invertible operator. It turns out that Q is the sum Q=Q1+Q2,\, \, Qi∈ N_i( H ) that satisfies 1+2= . That decomposition enables us to study properties of both functions, Q and Q, by studying the simple components Q1 and Q2.